Chiral anomaly
One of the quantum-field theoretic manifestations of chiral dissymmetry or chiral asymmetry. Chiral anomaly in $2$-dimensional quantum field theory means that the quantum field observables from the left and the right sectors of a field model do not commute. Chiral anomaly is deeply related to non-commutative geometry and the theory of anti-commutative algebras (cf. Anti-commutative algebra), which are not Lie algebras [a1], [a2]. Namely, if the chiral sectors admit symmetries described by a semi-simple Lie algebra $g$, then the whole model possesses symmetries, whose generators belong to the Borel–Lie anti-commutative central extension of the double $g+g$ (an anti-commutative algebra is called a Borel–Lie algebra (or BL-algebra) if every solvable subalgebra of it is a Lie algebra).
Field models with chiral anomaly are efficiently used for anomalous stereo-synthesis (e.g., octonionic stereo-synthesis) in real-time interactive binocular video-systems.
References
[a1] | D. Juriev, "Noncommutative geometry, chiral anomaly in the quantum projective $sl(2,C)$-invariant field theory and $jl(2,C)$-invariance" J. Math. Phys. , 33 (1992) pp. 2819–2822 |
[a2] | D. Juriev, "Erratum" J. Math. Phys. , 34 (1993) pp. 1615 |
Chiral anomaly. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Chiral_anomaly&oldid=16702